We propose a new approach to analyze data that naturally lie on manifolds. We focus on a special class of manifolds, called direct product manifolds, whose intrinsic dimension could be very high. Our method finds a low-dimensional representation of the manifold that can be used to find and visualize the principal modes of variation of the data, as Principal Component Analysis (PCA) does in linear spaces. The proposed method improves upon earlier manifold extensions of PCA by more concisely capturing important nonlinear modes. For the special case of data on a sphere, variation following nongeodesic arcs is captured in a single mode, compared to the two modes needed by previous methods. Several computational and statistical challenges are re...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
We analyze an algorithm based on principal component analysis (PCA) for detecting the dimension k of...
Abstract: A general framework is laid out for principal component analysis (PCA) on quotient spaces ...
We propose a new approach to analyze data that naturally lie on manifolds. We focus on a special cla...
The dissertation consists of two research topics regarding modern non-standard data analytic situati...
A general framework for a novel non-geodesic decomposition of high-dimensional spheres or high-dimen...
This paper presents a new framework for manifold learning based on a sequence of principal polynomia...
Principal Component Analysis (PCA) has been widely used for manifold description and dimensionality ...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
In 1901, Karl Pearson invented Principal Component Analysis (PCA). Since then, PCA serves as a proto...
Abstract—There is a need to be able to find patterns in high dimensional data sets. Often these patt...
Abstract. We present a new manifold learning algorithm that takes a set of data points lying on or n...
We revisit the problem of extending the notion of principal component analysis (PCA) to multivariate...
Constructing an efficient parametrization of a large, noisy data set of points lying close to a smoo...
Functional data analysis on nonlinear manifolds has drawn recent interest. We propose an intrinsic p...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
We analyze an algorithm based on principal component analysis (PCA) for detecting the dimension k of...
Abstract: A general framework is laid out for principal component analysis (PCA) on quotient spaces ...
We propose a new approach to analyze data that naturally lie on manifolds. We focus on a special cla...
The dissertation consists of two research topics regarding modern non-standard data analytic situati...
A general framework for a novel non-geodesic decomposition of high-dimensional spheres or high-dimen...
This paper presents a new framework for manifold learning based on a sequence of principal polynomia...
Principal Component Analysis (PCA) has been widely used for manifold description and dimensionality ...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
In 1901, Karl Pearson invented Principal Component Analysis (PCA). Since then, PCA serves as a proto...
Abstract—There is a need to be able to find patterns in high dimensional data sets. Often these patt...
Abstract. We present a new manifold learning algorithm that takes a set of data points lying on or n...
We revisit the problem of extending the notion of principal component analysis (PCA) to multivariate...
Constructing an efficient parametrization of a large, noisy data set of points lying close to a smoo...
Functional data analysis on nonlinear manifolds has drawn recent interest. We propose an intrinsic p...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
We analyze an algorithm based on principal component analysis (PCA) for detecting the dimension k of...
Abstract: A general framework is laid out for principal component analysis (PCA) on quotient spaces ...